Euler's Totient Function Game

\(\phi(n)\) (read phi(n)) denotes how many positive integers which less or equal to \(n\) that relatively prime with \(n\). Let \(m\) and \(x\) be the positive integers which satisfy \(\phi(2015^{2015}) = m\) and \(x =n(A)\) which \(A = \{r | \phi(r) = 2015^{2015} , r \in N\}\) Find the value of \[mx\]

×

Problem Loading...

Note Loading...

Set Loading...